Global Asymptotic Stability in Some Discrete Dynamical Systems

For the nonlinear discrete dynamical system x s Tx on bounded, closed kq 1 k and convex set D ; R n , we present several sufficient and necessary conditions under which the unique equilibrium point is globally exponentially asymptotically stable. The infimum of exponential bounds of convergent traje

This paper is concerned with dynamical stability of general dynamical systems. We discuss invariance properties of some limit sets, investigate connections between various notions and definitions related to stability and attraction properties, and establish existence results for invariant uniform at

We give new necessary and sufficient conditions under which the zero solution of Ž . Lienard-type systems is globally asymptotically stable. To this end, we examine i ´Ž . whether all trajectories intersect the vertical isocline or not and ii whether all trajectories tend to the origin or not. We al

In this paper we present a technique to stabilize discrete-time linear systems with bounded inputs. Based on optimal control techniques, we construct a continuous bounded state feedback which leads to global asymptotic stabilization for the case where the open-loop system has all its eigenvalues wit